Universal CupThe Pharaohs use the relative movement and gravity of planets to accelerate their spaceships. Suppose a spaceship will pass by $n$ planets with orbital speeds $p[0], p[1], \ldots, p[n-1]$ in order. For each planet, the Pharaohs scientists can choose whether to accelerate the spaceship using this planet or not. To save energy, after accelerating by a planet with orbital speed $p[i]$, the spaceship cannot be accelerated using any planet with orbital speed $p[j] < p[i]$. In other words, the chosen planets form an increasing subsequence of $p[0], p[1], \ldots, p[n-1]$. A subsequence of p is a sequence that's derived from $p$ by deleting zero or more elements of $p$. For example $[0]$, $[]$, $[0,2]$ , and $[0,1,2]$ are subsequences of $[0,1,2]$, but $[2,1]$ is not.
The scientists have identified that there are a total of $k$ different ways a set of planets can be chosen to accelerate the spaceship, but they have lost their record of all the orbital speeds (even the value of $n$). However, they remember that $(p[0],p[1],\ldots, p[n-1])$ is a permutation of $\{0, 1, \ldots, n-1\}$. A permutation is a sequence containing each integer from $0$ to $n-1$ exactly once. Your task is to find one possible permutation $p[0], p[1], \ldots, p[n-1]$ of sufficiently small length.
You need to solve the problem for $q$ different spaceships. For each spaceship $i$, you get an integer $k_i$, representing the number of different ways a set of planets can be chosen to accelerate the spaceship. Your task is to find a sequence of orbital speeds with a small enough length $n_i$ such that there are exactly $k_i$ ways a subsequence of planets with increasing orbital speeds can be chosen.
Implementation details
You should implement the following procedure:
int[] construct_permutation(int64 k)
- $k$: is the desired number of increasing subsequences.
- This procedure should return an array of $n$ elements where each element is between $0$ and $n-1$ inclusive.
- The returned array must be a valid permutation having exactly $k$ increasing subsequences.
- This procedure is called a total $q$ of times. Each of these calls should be treated as a separate scenario.
Constraints
- $1 \le q \le 100$
- $2 \le k_i \le 10^{18}$ (for all $0 \leq i \le q-1$)
Subtasks
- (10 points) $2 \le k_i \le 90$ (for all $0 \leq i \le q-1$). If all permutations you used have length at most $90$ and are correct, you receive $10$ points, otherwise $0$.
- (90 points) No additional constraints. For this subtask, let $m$ be the maximum permutation length you used in any scenario. Then, your score is calculated according to the following table:
| Condition | Score |
|---|---|
| $ m \le 90$ | $90$ |
| $90 \lt m \le 120$ | $90-\frac{(m-90)}{3}$ |
| $120 \lt m \le 5000$ | $$80-\frac{(m-120)}{65}$$ |
| $m \gt 5000$ | $0$ |
Example
Example 1
Consider the following call:
construct_permutation(3)
This procedure should return a permutation with exactly $3$ increasing subsequences. A possible answer is $[1,0]$, which has $[]$ (empty subsequence), $[0]$ and $[1]$ as increasing subsequences.
Example 2
Consider the following call:
construct_permutation(8)
This procedure should return a permutation with exactly $8$ increasing subsequences. A possible answer is $[0,1,2]$.
Sample grader
The sample grader reads the input in the following format:
- line $1$: $\,\,q$
- line $2+i$ ($0 \le i \le q-1$): $\,\,k_i$
The sample grader prints a single line for each $k_i$ containing the return value of construct_permutation, or an error message if one has occurred.